Daily Archives: January 30, 2013

No-cloning theorem 3

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No-cloning in a classical context

There is a classical analogue to the quantum no-cloning theorem, which we might state as follows: given only the result of one flip of a (possibly biased) coin, we cannot simulate a second, independent toss of the same coin. The proof of this statement uses the linearity of classical probability, and has exactly the same structure as the proof of the quantum no-cloning theorem.

Thus if we wish to claim that no-cloning is a uniquely quantum result, some care is necessary in stating the theorem. One way of restricting the result to quantum mechanics is to restrict the states to pure states, where a pure state is defined to be one that is not a convex combination of other states. The classical pure states are pairwise orthogonal, but quantum pure states are not.

— Wikipedia on No-cloning theorem

2013.01.30 Wednesday ACHK

驗算極限 1.1

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微積分 3.1

這段改編自 2010 年 6 月 15 日的對話。

運算 limit(極限值)的題目時,有一個很簡單的方法驗算。那就是用計數機再運算一次。例如,假設你透過徒手運算,得到以下答案:

lim_{x -> 3} (x^2 – 9)/(x – 3) = 6

用計數機驗算時,雖然你不可以代 3 落 x 之中,因為那會導致分母變 0,但是,你卻可以代一個十分接近 3 的數字,例如 3.001,看看那數學式子的數值,是否十分接近你的運算結果。(還有,那正正是 limit 這個抽象數學概念,背後的真正實際意思。)

(3.001^2 – 9)/(3.001 – 3) = 6.001

但是,如果 x 所趨向的是「無限大」,你應代什麼數,才為之「接近無限大」呢?

你可以試試代一個大數,例如 100,000。我們看看另一道例題:

lim_{x -> infinity} (3 x^2 – 9 x – 3)(4 x^2 – 3)

你先徒手運算。假設得到的答案是 3/4。然後,你用計數機,把 x = 100,000 代落數式之中:

(3 (100000)^2 – 9 (100000) – 3}{4(100000)^2 – 3)

如果你發覺計數機的結果,十分接近你的答案,你運算錯誤的機會,就微乎其微。

(3 (100000)^2 – 9 (100000) – 3)/(4(100000)^2 – 3) = 0.7499775

— Me@2013.01.29

2013.01.30 Wednesday (c) All rights reserved by ACHK